一致数列an前n项和为Sn 且a1 a15=17(1)若an为等差数列
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![一致数列an前n项和为Sn 且a1 a15=17(1)若an为等差数列](/uploads/image/f/1135252-28-2.jpg?t=%E4%B8%80%E8%87%B4%E6%95%B0%E5%88%97an%E5%89%8Dn%E9%A1%B9%E5%92%8C%E4%B8%BASn+%E4%B8%94a1+a15%3D17%281%29%E8%8B%A5an%E4%B8%BA%E7%AD%89%E5%B7%AE%E6%95%B0%E5%88%97)
1.Sn=-2an+3有S(n-1)=-2a(n-1)+3则an=Sn-S(n-1)=-2an+2a(n-1)=>an=a(n-1)*2/3所以,{an}为共比数列,q=2/32.Sn=-2an+3有
(1)由已知有:2a1=4096得a1=2048,又an+sn=4096,an+1+Sn+1=4096,两式相减得an+1=an/2,所以an是以1/2为公比的等比数列,故an=2048*(1/2)^
a(1)=s(1)=1-5a(1)-85,6a(1)=-84,a(1)=-14.a(n+1)=s(n+1)-s(n)=(n+1)-5a(n+1)-85-[n-5a(n)-85]=1-5a(n+1)+5
2·a(n)=2[Sn-S(n-1)]=(n+1)an-n·a(n-1)∴(n-1)an=n·a(n-1),∴an/[a(n-1)]=n/(n-1),.,a3/a2=3/2,a2/a1=2/1,将上述
当n=1时、有2s1+1=3a1,即有a1=1,因为2Sn+1=3an,所以2Sn+1+1=3an+1.后式减去前式,得2an+1=3an+1-3an.即有an+1=3an,为等比数列,且公比为3,所
证明:∵Sn=an(an+1)2∴S1=a1(1+a1)2∴a1=1…(1分)由2Sn=a2n+an2Sn-1=a2n-1+an-1⇒2an=2(Sn-Sn-1)=a2n-a2n-1+an-an-1…
an=Sn-S(n-1)=(1/2)^n-(1/2)^(n-1)=-(1/2)^na1=-1/2=1/2+aa=-1
sn=an^2+bns(n-1)=a(n-1)^2+b(n-1)两式作差,由:sn-s(n-1)=an可证.
an+sn=-2n-1,当n=1时,a1+s1=-3,则a1=-3/2.由已知得:sn=-2n-1-an当n大于或等于2时,则an=sn-s(n-1)=-2n-1-an-[-2(n-1)-1-a(n-
Sn=n-5an-85S1=1-5a1-85即a1=1-5a1-85解得a1=-14an=Sn-S(n-1)=n-5an-85-[(n-1)-5a(n-1)-85]=-5an+5a(n-1)+16an
Sn=n-5an-85(1)S(n+1)=n+1-5a(n+1)-85(2)(2)-(1)整理得6a(n+1)=1+5an即a(n+1)-1=(5/6)(an-1)又由S1=a1=1-5a1-85得a
由Sn=n-Sa知,an=Sn-Sn-1=1(>=2).a1=1-Sa
1.n=1时,a1=S1=1²+1=2n≥2时,Sn=n²+nS(n-1)=(n-1)²+(n-1)an=Sn-S(n-1)=n²+n-(n-1)²-
(1)证明:∵Sn=n-5an-85,n∈N*(1)∴Sn+1=(n+1)-5an+1-85(2),由(2)-(1)可得:an+1=1-5(an+1-an),即:an+1-1=56(an-1),从而{
(1)当n=1时,a1=S1=13(a1−1),得a1=−12;当n=2时,S2=a1+a2=13(a2−1),得a2=14,同理可得a3=−18.(2)当n≥2时,an=Sn−Sn−1=13(an−
∵点(an,Sn)在直线2x-y-3=0上,∴2an-Sn=3,①∴2an-1-Sn-1=3(n≥2)②①-②得:2(an-an-1)=Sn-Sn-1=an,∴an=2an-1(n≥2)又2a1-a1
(Ⅰ)a1=3,当n≥2时,Sn−1=23an−1+1,∴n≥2时,an=Sn−Sn−1=23an−23an−1,∴n≥2时,anan−1=−2∴数列an是首项为a1=3,公比为q=-2的等比数列,∴
(1)把Sn=和Sn-1=表示出来,再相减,就得到An=aAn-1所以,首项为a公比为a(2)解集合A的1所以Sn>aSn=[a(1-a^n)]/(1-a)当n趋向于无穷大时,a^n趋向于零此时,令S
S(n)=n(a(n)+1)/2S(n-1)=(n-1)(a(n-1)+1)/2两式相减得2a(n)=n(a(n)+1))-(n-1)(a(n-1)+1)(2-n)a(n)=-(n-1)a(n-1)+
解题思路:考查数列的通项,考查等差数列的证明,考查数列的求和,考查存在性问题的探究,考查分离参数法的运用解题过程: